More About Operator Order Preserving

Abstract

It is well known that increasing functions do not preserve operator order in general; nor do decreasing functions reverse operator order. However, operator monotone increasing or operator monotone decreasing do. In this article, we employ a convex approach to discuss operator order preserving or conversing. As an easy consequence of more general results, we find non-negative constants γ and such that A≤ B implies f(B)≤ f(A)+γ 1H\;~and~\;f(A)≤ f(B)+ 1H, for the self adjoint operators A,B on a Hilbert space H with identity operator 1H and for the convex function f whose domain contains the spectra of both A and B. The connection of these results to the existing literature will be discussed and the significance will be emphasized by some examples.